In this paper, we introduce an analytical solution of the fractional derivative gas transport equation using the power-series technique. We present a new universal transform, namely, generalized Boltzmann change of variable which depends on the fractional order, time and space. This universal transform is employed to transfer the partial differential equation into an ordinary differential equation. Moreover, the convergence of the solution has been investigated and found that solutions are unconditionally converged. Results are introduced and discussed for the universal variable and other physical parameters such as porosity and permeability of the reservoir; time and space. Keywords: Fractional derivative, Porous media, Natural gas, Reserv...
This report surveys recent advances on numerical solution of fractional PDEs, which describe “anomal...
This paper addresses the model, solution, and analysis of fluid flow behavior in fractal reservoirs ...
In this study, the homotopy perturbation transform method (HPTM) is performed to give approximate an...
We model the transport of fluid through porous media in terms of fractional diffusion equation (FDE)...
We model the transport of fluid through porous media in terms of fractional diffusion equation (FDE)...
In this paper, fractional order derivative, fractal dimension and spectral dimension are introduced ...
The non-Darcian flow and solute transport in geometrically nonlinear porous media are modeled with R...
AbstractIn this paper, we discuss a fractional model arising in flow of two incompatible liquids thr...
In this paper, we discuss a fractional model arising in flow of two incompatible liquids through hom...
The anomalous transport of a viscous fluid across a porous media with power-law scaling of the geome...
Solute transport in the fractured porous confined aquifer is modeled by the advection-dispersion equ...
In recent time there is a very great interest in the study of differential equations of fractional o...
Unconventional hydrocarbon reservoirs, such as, shale gas deposits, offer a new source of energy res...
Utilizing the double-porosity approach it is assumed that porous medium is constituted by two groups...
This master's thesis considers the fractional general porous medium equation; a nonlocal equation wi...
This report surveys recent advances on numerical solution of fractional PDEs, which describe “anomal...
This paper addresses the model, solution, and analysis of fluid flow behavior in fractal reservoirs ...
In this study, the homotopy perturbation transform method (HPTM) is performed to give approximate an...
We model the transport of fluid through porous media in terms of fractional diffusion equation (FDE)...
We model the transport of fluid through porous media in terms of fractional diffusion equation (FDE)...
In this paper, fractional order derivative, fractal dimension and spectral dimension are introduced ...
The non-Darcian flow and solute transport in geometrically nonlinear porous media are modeled with R...
AbstractIn this paper, we discuss a fractional model arising in flow of two incompatible liquids thr...
In this paper, we discuss a fractional model arising in flow of two incompatible liquids through hom...
The anomalous transport of a viscous fluid across a porous media with power-law scaling of the geome...
Solute transport in the fractured porous confined aquifer is modeled by the advection-dispersion equ...
In recent time there is a very great interest in the study of differential equations of fractional o...
Unconventional hydrocarbon reservoirs, such as, shale gas deposits, offer a new source of energy res...
Utilizing the double-porosity approach it is assumed that porous medium is constituted by two groups...
This master's thesis considers the fractional general porous medium equation; a nonlocal equation wi...
This report surveys recent advances on numerical solution of fractional PDEs, which describe “anomal...
This paper addresses the model, solution, and analysis of fluid flow behavior in fractal reservoirs ...
In this study, the homotopy perturbation transform method (HPTM) is performed to give approximate an...